Classification of connected shelves

Authors

  • Mohamed Elhamdadi University of South Florida
  • Neranga Fernando Knox College
  • Mathew Goonewardena Ericsson, Montreal, QC, Canada

DOI:

https://doi.org/10.53733/329

Abstract

We investigate finite right-distributive binary algebraic structures called shelves. We first use symbolic computations with Python to classify (up to isomorphism) all connected shelves with order less than six. We explore the group structure generated by the rows of latin shelves. We also define two-variable shelf polynomial by analogy with the quandle polynomial and then state a conjecture about connected idempotent shelves.

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Author Biographies

Mohamed Elhamdadi, University of South Florida

Mohamed Elhamdadi
Department of Mathematics and Statistics,
University of South Florida,
4202 E. Fowler Avenue
Tampa, FL 33620
USA
emohamed@usf.edu

Neranga Fernando, Knox College

Neranga Fernando
Department of Mathematics,
Knox College,
2 E South St
Galesburg, IL 61401
USA
nfernando@knox.edu

Mathew Goonewardena, Ericsson, Montreal, QC, Canada

Mathew Goonewardena
Ericsson,
Montreal, QC,
Canada
mathew.goonewardena@ericsson.com

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Published

09-09-2025

How to Cite

Elhamdadi, M., Fernando, N., & Goonewardena, M. . (2025). Classification of connected shelves. New Zealand Journal of Mathematics, 56, 53–68. https://doi.org/10.53733/329

Issue

Vol. 56 (2025)

Section

Articles